a) Magnitude of air resistance: 784 N
b) Terminal speed: 56 m/s
c) Yes, the skydiver has an upward non-zero acceleration
d) Drag force after the skydiver opens the parachute:
e) New terminal speed: 3.6 m/s
Explanation:
a)
The skydiver in free fall has two forces acting on her: the force of gravity (acting downward) and the air resistance (acting upward). While the force of gravity is constant, the air resistance increases with speed: therefore, as the skydiver falls down, since her speed increases, the air resistance increases too until its value becomes equal to the magnitude of the force of gravity. From this point, the skydiver's acceleration becomes zero, and therefore she continues her fall at a constant velocity, called terminal speed.
Therefore, the terminal speed occurs when the magnitude of the air resistance is equal to the magnitude of the force of gravity:
where
m = 80.0 kg is the mass of the skydiver+parachute
is the acceleration due to gravity
Substituting, we find
b)
The drag force for a body falling through the air is given by
where
k is a coefficient that depends on the shape and size of the body, and on the air density
v is the speed of the body
As we said in part a), when a body reaches its terminal speed, the air resistance is equal to the force of gravity. Therefore:
Here we have
m = 80.0 kg
k = 0.250 kg/m
Solving for v, we find the terminal speed:
c)
Just before deploying the parachute, the skydiver has already reached the terminal speed: this means that at that moment the acceleration of the skydiver is zero, because the force of gravity (downward) is balanced by the air resistance (upward).
Then, the skydiver deploys the parachute. The parachute has a larger surface, therefore increasing the coefficient k of the air resistance formula. As a result, the magnitude of the air resistance becomes suddenly larger than that of the force of gravity.
As a result, there is now an upward net force acting on the skydiver, so a non-zero force: and therefore, according to Newton's second law of motion,
This means that now the skydiver has a non-zero acceleration (precisely, the direction of the acceleration is upward), and therefore she will start slowing down.
d)
The magnitude of the drag force acting on the skydiver is always given by
where
k is the coefficient
v is the speed
Immediately after the skydiver opens the parachute, the speed is still her terminal speed, so
v = 56 m/s
Instaed, the coefficient has now became
k = 60.0 kg/m
Therefore, the new drag force acting on the skydiver and parachute is
e)
After the skydiver opens the parachute, the drag force suddenly increases. As a result, the speed of the skydiver will decrease (because of the upward acceleration), because the drag force is now larger than the force of gravity.
However, as the speed decreases, the drag force decreases too, until at some point the drag force will become again equal to the force of gravity. When this occurs, the skydiver's acceleration will become zero again, and she will continue with a new constant velocity, a new terminal speed.
This will occur when the drag force is equal to the force of gravity, so:
where
k = 60.0 kg/m is the new coefficient
And solving for v, we find:
Learn more about free fall:
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